02164cam 2200421 i 450000100090000000300050000900500170001400600190003100700150005000800410006502000270010604000340013305000270016708200180019410000230021224500980023526400710033326400100040430000520041433600210046633700250048733800230051249000740053550000660060950400650067550504260074050600500116653300950121653800360131158800470134765000390139465000270143365000340146070000330149477601230152785600440165085600480169418282021RPAM20170613145107.0ma b 001 0 cr/|||||||||||170613t20142014riua ob 001 0 eng a9781470419653 (online) aDLCbengcDLCerdadDLCdRPAM00aQC174.85.S34bF89 201400a515/.24332231 aFu, Xiaoye,d1979-10aSelf-affine scaling sets in Rp2s /h[electronic resource] cXiaoye Fu, Jean-Pierre Gabardo. 1aProvidence, Rhode Island :bAmerican Mathematical Society,c[2014] 4cÃ2014 a1 online resource (v, 86 pages : illustrations) atext2rdacontent aunmediated2rdamedia avolume2rdacarrier0 aMemoirs of the American Mathematical Society, x1947-6221 ; vv. 1097 a"Volume 233, number 1097 (third of 6 numbers), January 2015." aIncludes bibliographical references (pages 83-84) and index.00tChapter 1. IntroductiontChapter 2. Preliminary ResultstChapter 3. A sufficient condition for a self-affine tile to be an MRA scaling settChapter 4. Characterization of the inclusion $K\subset BK$tChapter 5. Self-affine scaling sets in $\mathbb {R}^2$: the case $0\in \mathcal {D}$tChapter 6. Self-affine scaling sets in $\mathbb {R}^2$: the case $\mathcal {D}=\{d_1,d_2\}\subset \mathbb {R}^2$tChapter 7. Conclusion1 aAccess is restricted to licensed institutions aElectronic reproduction.bProvidence, Rhode Island :cAmerican Mathematical Society.d2015 aMode of access : World Wide Web aDescription based on print version record. 0aScaling laws (Statistical physics) 0aWavelets (Mathematics) 0aR (Computer program language)1 aGabardo, Jean-Pierre,d1958-0 iPrint version: aFu, Xiaoye, 1979-tSelf-affine scaling sets in Rp2s /w(DLC) 2014033063x0065-9266z97814704109194 3Contentsuhttp://www.ams.org/memo/1097/4 3Contentsuhttps://doi.org/10.1090/memo/1097