{"status":"ok","message-type":"work","message-version":"1.0.0","message":{"indexed":{"date-parts":[[2026,4,22]],"date-time":"2026-04-22T05:38:19Z","timestamp":1776836299367,"version":"3.51.2"},"reference-count":16,"publisher":"American Mathematical Society (AMS)","issue":"254","license":[{"start":{"date-parts":[[2006,12,8]],"date-time":"2006-12-08T00:00:00Z","timestamp":1165536000000},"content-version":"am","delay-in-days":365,"URL":"https:\/\/www.ams.org\/publications\/copyright-and-permissions"}],"content-domain":{"domain":[],"crossmark-restriction":false},"short-container-title":["Math. Comp."],"abstract":"<p>\n                    In [\n                    <italic>Found. Comput. Math.<\/italic>\n                    , 2 (2002), pp. 203\u2013245], Cohen, Dahmen, and DeVore proposed an adaptive wavelet algorithm for solving general operator equations. Assuming that the operator defines a boundedly invertible mapping between a Hilbert space and its dual, and that a Riesz basis of wavelet type for this Hilbert space is available, the operator equation is transformed into an equivalent well-posed infinite matrix-vector system. This system is solved by an iterative method, where each application of the infinite stiffness matrix is replaced by an adaptive approximation. It was shown that if the errors of the best linear combinations from the wavelet basis with\n                    <inline-formula content-type=\"math\/mathml\">\n                      <mml:math xmlns:mml=\"http:\/\/www.w3.org\/1998\/Math\/MathML\" alttext=\"upper N\">\n                        <mml:semantics>\n                          <mml:mi>N<\/mml:mi>\n                          <mml:annotation encoding=\"application\/x-tex\">N<\/mml:annotation>\n                        <\/mml:semantics>\n                      <\/mml:math>\n                    <\/inline-formula>\n                    terms are\n                    <inline-formula content-type=\"math\/mathml\">\n                      <mml:math xmlns:mml=\"http:\/\/www.w3.org\/1998\/Math\/MathML\" alttext=\"script upper O left-parenthesis upper N Superscript negative s Baseline right-parenthesis\">\n                        <mml:semantics>\n                          <mml:mrow>\n                            <mml:mrow class=\"MJX-TeXAtom-ORD\">\n                              <mml:mi class=\"MJX-tex-caligraphic\" mathvariant=\"script\">O<\/mml:mi>\n                            <\/mml:mrow>\n                            <mml:mo stretchy=\"false\">(<\/mml:mo>\n                            <mml:msup>\n                              <mml:mi>N<\/mml:mi>\n                              <mml:mrow class=\"MJX-TeXAtom-ORD\">\n                                <mml:mo>\n                                  \u2212\n                                  \n                                <\/mml:mo>\n                                <mml:mi>s<\/mml:mi>\n                              <\/mml:mrow>\n                            <\/mml:msup>\n                            <mml:mo stretchy=\"false\">)<\/mml:mo>\n                          <\/mml:mrow>\n                          <mml:annotation encoding=\"application\/x-tex\">\\mathcal {O}(N^{-s})<\/mml:annotation>\n                        <\/mml:semantics>\n                      <\/mml:math>\n                    <\/inline-formula>\n                    for some\n                    <inline-formula content-type=\"math\/mathml\">\n                      <mml:math xmlns:mml=\"http:\/\/www.w3.org\/1998\/Math\/MathML\" alttext=\"s greater-than 0\">\n                        <mml:semantics>\n                          <mml:mrow>\n                            <mml:mi>s<\/mml:mi>\n                            <mml:mo>&gt;<\/mml:mo>\n                            <mml:mn>0<\/mml:mn>\n                          <\/mml:mrow>\n                          <mml:annotation encoding=\"application\/x-tex\">s&gt;0<\/mml:annotation>\n                        <\/mml:semantics>\n                      <\/mml:math>\n                    <\/inline-formula>\n                    , which is determined by the Besov regularity of the solution and the order of the wavelet basis, then approximations yielded by the adaptive method with\n                    <inline-formula content-type=\"math\/mathml\">\n                      <mml:math xmlns:mml=\"http:\/\/www.w3.org\/1998\/Math\/MathML\" alttext=\"upper N\">\n                        <mml:semantics>\n                          <mml:mi>N<\/mml:mi>\n                          <mml:annotation encoding=\"application\/x-tex\">N<\/mml:annotation>\n                        <\/mml:semantics>\n                      <\/mml:math>\n                    <\/inline-formula>\n                    terms also have errors of\n                    <inline-formula content-type=\"math\/mathml\">\n                      <mml:math xmlns:mml=\"http:\/\/www.w3.org\/1998\/Math\/MathML\" alttext=\"script upper O left-parenthesis upper N Superscript negative s Baseline right-parenthesis\">\n                        <mml:semantics>\n                          <mml:mrow>\n                            <mml:mrow class=\"MJX-TeXAtom-ORD\">\n                              <mml:mi class=\"MJX-tex-caligraphic\" mathvariant=\"script\">O<\/mml:mi>\n                            <\/mml:mrow>\n                            <mml:mo stretchy=\"false\">(<\/mml:mo>\n                            <mml:msup>\n                              <mml:mi>N<\/mml:mi>\n                              <mml:mrow class=\"MJX-TeXAtom-ORD\">\n                                <mml:mo>\n                                  \u2212\n                                  \n                                <\/mml:mo>\n                                <mml:mi>s<\/mml:mi>\n                              <\/mml:mrow>\n                            <\/mml:msup>\n                            <mml:mo stretchy=\"false\">)<\/mml:mo>\n                          <\/mml:mrow>\n                          <mml:annotation encoding=\"application\/x-tex\">\\mathcal {O}(N^{-s})<\/mml:annotation>\n                        <\/mml:semantics>\n                      <\/mml:math>\n                    <\/inline-formula>\n                    . Moreover, their computation takes only\n                    <inline-formula content-type=\"math\/mathml\">\n                      <mml:math xmlns:mml=\"http:\/\/www.w3.org\/1998\/Math\/MathML\" alttext=\"script upper O left-parenthesis upper N right-parenthesis\">\n                        <mml:semantics>\n                          <mml:mrow>\n                            <mml:mrow class=\"MJX-TeXAtom-ORD\">\n                              <mml:mi class=\"MJX-tex-caligraphic\" mathvariant=\"script\">O<\/mml:mi>\n                            <\/mml:mrow>\n                            <mml:mo stretchy=\"false\">(<\/mml:mo>\n                            <mml:mi>N<\/mml:mi>\n                            <mml:mo stretchy=\"false\">)<\/mml:mo>\n                          <\/mml:mrow>\n                          <mml:annotation encoding=\"application\/x-tex\">\\mathcal {O}(N)<\/mml:annotation>\n                        <\/mml:semantics>\n                      <\/mml:math>\n                    <\/inline-formula>\n                    operations,\n                    <italic>provided<\/italic>\n                    <inline-formula content-type=\"math\/mathml\">\n                      <mml:math xmlns:mml=\"http:\/\/www.w3.org\/1998\/Math\/MathML\" alttext=\"s greater-than s Superscript asterisk\">\n                        <mml:semantics>\n                          <mml:mrow>\n                            <mml:mi>s<\/mml:mi>\n                            <mml:mo>&gt;<\/mml:mo>\n                            <mml:msup>\n                              <mml:mi>s<\/mml:mi>\n                              <mml:mo>\n                                \u2217\n                                \n                              <\/mml:mo>\n                            <\/mml:msup>\n                          <\/mml:mrow>\n                          <mml:annotation encoding=\"application\/x-tex\">s&gt;s^*<\/mml:annotation>\n                        <\/mml:semantics>\n                      <\/mml:math>\n                    <\/inline-formula>\n                    , with\n                    <inline-formula content-type=\"math\/mathml\">\n                      <mml:math xmlns:mml=\"http:\/\/www.w3.org\/1998\/Math\/MathML\" alttext=\"s Superscript asterisk\">\n                        <mml:semantics>\n                          <mml:msup>\n                            <mml:mi>s<\/mml:mi>\n                            <mml:mo>\n                              \u2217\n                              \n                            <\/mml:mo>\n                          <\/mml:msup>\n                          <mml:annotation encoding=\"application\/x-tex\">s^*<\/mml:annotation>\n                        <\/mml:semantics>\n                      <\/mml:math>\n                    <\/inline-formula>\n                    being a measure of how well the infinite stiffness matrix with respect to the wavelet basis can be approximated by computable sparse matrices. Under appropriate conditions on the wavelet basis, for both differential and singular integral operators and for the relevant range of\n                    <inline-formula content-type=\"math\/mathml\">\n                      <mml:math xmlns:mml=\"http:\/\/www.w3.org\/1998\/Math\/MathML\" alttext=\"s\">\n                        <mml:semantics>\n                          <mml:mi>s<\/mml:mi>\n                          <mml:annotation encoding=\"application\/x-tex\">s<\/mml:annotation>\n                        <\/mml:semantics>\n                      <\/mml:math>\n                    <\/inline-formula>\n                    , in [\n                    <italic>SIAM J. Math. Anal.<\/italic>\n                    , 35(5) (2004), pp. 1110\u20131132] we showed that\n                    <inline-formula content-type=\"math\/mathml\">\n                      <mml:math xmlns:mml=\"http:\/\/www.w3.org\/1998\/Math\/MathML\" alttext=\"s Superscript asterisk Baseline greater-than s\">\n                        <mml:semantics>\n                          <mml:mrow>\n                            <mml:msup>\n                              <mml:mi>s<\/mml:mi>\n                              <mml:mrow class=\"MJX-TeXAtom-ORD\">\n                                <mml:mo>\n                                  \u2217\n                                  \n                                <\/mml:mo>\n                              <\/mml:mrow>\n                            <\/mml:msup>\n                            <mml:mo>&gt;<\/mml:mo>\n                            <mml:mi>s<\/mml:mi>\n                          <\/mml:mrow>\n                          <mml:annotation encoding=\"application\/x-tex\">s^{\\ast }&gt;s<\/mml:annotation>\n                        <\/mml:semantics>\n                      <\/mml:math>\n                    <\/inline-formula>\n                    ,\n                    <italic>assuming<\/italic>\n                    that each entry of the stiffness matrix is exactly available at unit cost. Generally these entries have to be approximated using numerical quadrature. In this paper, restricting ourselves to differential operators, we develop a numerical integration scheme that computes these entries giving an additional error that is consistent with the approximation error, whereas in each column the average computational cost per entry is\n                    <inline-formula content-type=\"math\/mathml\">\n                      <mml:math xmlns:mml=\"http:\/\/www.w3.org\/1998\/Math\/MathML\" alttext=\"script upper O left-parenthesis 1 right-parenthesis\">\n                        <mml:semantics>\n                          <mml:mrow>\n                            <mml:mrow class=\"MJX-TeXAtom-ORD\">\n                              <mml:mrow class=\"MJX-TeXAtom-ORD\">\n                                <mml:mi class=\"MJX-tex-caligraphic\" mathvariant=\"script\">O<\/mml:mi>\n                              <\/mml:mrow>\n                            <\/mml:mrow>\n                            <mml:mo stretchy=\"false\">(<\/mml:mo>\n                            <mml:mn>1<\/mml:mn>\n                            <mml:mo stretchy=\"false\">)<\/mml:mo>\n                          <\/mml:mrow>\n                          <mml:annotation encoding=\"application\/x-tex\">{\\mathcal O}(1)<\/mml:annotation>\n                        <\/mml:semantics>\n                      <\/mml:math>\n                    <\/inline-formula>\n                    . As a consequence, we can conclude that the adaptive wavelet algorithm has optimal computational complexity.\n                  <\/p>","DOI":"10.1090\/s0025-5718-05-01807-7","type":"journal-article","created":{"date-parts":[[2006,2,15]],"date-time":"2006-02-15T11:05:20Z","timestamp":1140001520000},"page":"697-709","source":"Crossref","is-referenced-by-count":20,"title":["Computation of differential operators in wavelet coordinates"],"prefix":"10.1090","volume":"75","author":[{"given":"Tsogtgerel","family":"Gantumur","sequence":"first","affiliation":[]},{"given":"Rob","family":"Stevenson","sequence":"additional","affiliation":[]}],"member":"14","published-online":{"date-parts":[[2005,12,8]]},"reference":[{"key":"1","series-title":"Teubner-Texte zur Mathematik [Teubner Texts in Mathematics]","isbn-type":"print","doi-asserted-by":"publisher","DOI":"10.1007\/978-3-663-11374-4","volume-title":"Sobolev spaces on domains","volume":"137","author":"Burenkov, Victor I.","year":"1998","ISBN":"https:\/\/id.crossref.org\/isbn\/3815420687"},{"issue":"3","key":"2","doi-asserted-by":"publisher","first-page":"203","DOI":"10.1007\/s102080010027","article-title":"Adaptive wavelet methods. II. Beyond the elliptic case","volume":"2","author":"Cohen, A.","year":"2002","journal-title":"Found. Comput. Math.","ISSN":"https:\/\/id.crossref.org\/issn\/1615-3375","issn-type":"print"},{"key":"3","isbn-type":"print","first-page":"417","article-title":"Wavelet methods in numerical analysis","author":"Cohen, Albert","year":"2000","ISBN":"https:\/\/id.crossref.org\/isbn\/0444503501"},{"issue":"2","key":"4","doi-asserted-by":"publisher","first-page":"193","DOI":"10.1007\/PL00005404","article-title":"Wavelet adaptive method for second order elliptic problems: boundary conditions and domain decomposition","volume":"86","author":"Cohen, A.","year":"2000","journal-title":"Numer. Math.","ISSN":"https:\/\/id.crossref.org\/issn\/0029-599X","issn-type":"print"},{"issue":"1","key":"5","doi-asserted-by":"publisher","first-page":"1","DOI":"10.1006\/acha.1997.0242","article-title":"The wavelet element method. I. Construction and analysis","volume":"6","author":"Canuto, Claudio","year":"1999","journal-title":"Appl. Comput. Harmon. Anal.","ISSN":"https:\/\/id.crossref.org\/issn\/1063-5203","issn-type":"print"},{"issue":"4","key":"6","first-page":"341","article-title":"Stability of multiscale transformations","volume":"2","author":"Dahmen, Wolfgang","year":"1996","journal-title":"J. Fourier Anal. Appl.","ISSN":"https:\/\/id.crossref.org\/issn\/1069-5869","issn-type":"print"},{"key":"7","isbn-type":"print","doi-asserted-by":"publisher","first-page":"51","DOI":"10.1017\/S0962492900002816","article-title":"Nonlinear approximation","author":"DeVore, Ronald A.","year":"1998","ISBN":"https:\/\/id.crossref.org\/isbn\/0521643163"},{"issue":"5","key":"8","doi-asserted-by":"publisher","first-page":"1203","DOI":"10.1137\/S0036141002417589","article-title":"The Bramble-Hilbert lemma for convex domains","volume":"35","author":"Dekel, S.","year":"2004","journal-title":"SIAM J. Math. Anal.","ISSN":"https:\/\/id.crossref.org\/issn\/0036-1410","issn-type":"print"},{"issue":"3-4","key":"9","doi-asserted-by":"publisher","first-page":"255","DOI":"10.1007\/BF03322055","article-title":"Wavelets with complementary boundary conditions\u2014function spaces on the cube","volume":"34","author":"Dahmen, Wolfgang","year":"1998","journal-title":"Results Math.","ISSN":"https:\/\/id.crossref.org\/issn\/0378-6218","issn-type":"print"},{"issue":"228","key":"10","doi-asserted-by":"publisher","first-page":"1533","DOI":"10.1090\/S0025-5718-99-01092-3","article-title":"Composite wavelet bases for operator equations","volume":"68","author":"Dahmen, Wolfgang","year":"1999","journal-title":"Math. Comp.","ISSN":"https:\/\/id.crossref.org\/issn\/0025-5718","issn-type":"print"},{"issue":"1","key":"11","doi-asserted-by":"publisher","first-page":"184","DOI":"10.1137\/S0036141098333451","article-title":"Wavelets on manifolds. I. Construction and domain decomposition","volume":"31","author":"Dahmen, Wolfgang","year":"1999","journal-title":"SIAM J. Math. Anal.","ISSN":"https:\/\/id.crossref.org\/issn\/0036-1410","issn-type":"print"},{"issue":"1","key":"12","doi-asserted-by":"publisher","first-page":"319","DOI":"10.1137\/S0036142997330949","article-title":"Element-by-element construction of wavelets satisfying stability and moment conditions","volume":"37","author":"Dahmen, Wolfgang","year":"1999","journal-title":"SIAM J. Numer. Anal.","ISSN":"https:\/\/id.crossref.org\/issn\/0036-1429","issn-type":"print"},{"key":"13","doi-asserted-by":"crossref","unstructured":"[GS05] T. Gantumur and R.P. Stevenson. Computation of singular integral operators in wavelet coordinates. Computing, 76:77\u2013107, 2006.","DOI":"10.1007\/s00607-005-0135-1"},{"issue":"3","key":"14","doi-asserted-by":"publisher","first-page":"1074","DOI":"10.1137\/S0036142902407988","article-title":"Adaptive solution of operator equations using wavelet frames","volume":"41","author":"Stevenson, Rob","year":"2003","journal-title":"SIAM J. Numer. Anal.","ISSN":"https:\/\/id.crossref.org\/issn\/0036-1429","issn-type":"print"},{"issue":"5","key":"15","doi-asserted-by":"publisher","first-page":"1110","DOI":"10.1137\/S0036141002411520","article-title":"On the compressibility operators in wavelet coordinates","volume":"35","author":"Stevenson, Rob","year":"2004","journal-title":"SIAM J. Math. Anal.","ISSN":"https:\/\/id.crossref.org\/issn\/0036-1410","issn-type":"print"},{"key":"16","unstructured":"[Ste04b] R.P. Stevenson. Composite wavelet bases with extended stability and cancellation properties. Preprint 1304, Department of Mathematics, Utrecht University, 2004. Submitted."}],"container-title":["Mathematics of Computation"],"original-title":[],"language":"en","link":[{"URL":"http:\/\/www.ams.org\/mcom\/2006-75-254\/S0025-5718-05-01807-7\/S0025-5718-05-01807-7.pdf","content-type":"unspecified","content-version":"vor","intended-application":"similarity-checking"},{"URL":"https:\/\/www.ams.org\/mcom\/2006-75-254\/S0025-5718-05-01807-7\/S0025-5718-05-01807-7.pdf","content-type":"unspecified","content-version":"vor","intended-application":"similarity-checking"}],"deposited":{"date-parts":[[2026,4,21]],"date-time":"2026-04-21T14:34:36Z","timestamp":1776782076000},"score":1,"resource":{"primary":{"URL":"https:\/\/www.ams.org\/mcom\/2006-75-254\/S0025-5718-05-01807-7\/"}},"subtitle":[],"short-title":[],"issued":{"date-parts":[[2005,12,8]]},"references-count":16,"journal-issue":{"issue":"254","published-print":{"date-parts":[[2006,4]]}},"alternative-id":["S0025-5718-05-01807-7"],"URL":"https:\/\/doi.org\/10.1090\/s0025-5718-05-01807-7","archive":["CLOCKSS","Portico"],"relation":{},"ISSN":["1088-6842","0025-5718"],"issn-type":[{"value":"1088-6842","type":"electronic"},{"value":"0025-5718","type":"print"}],"subject":[],"published":{"date-parts":[[2005,12,8]]}}}