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005 20020507180925.0
008 931116s1986    uk            ||| | eng  
020   $a0582994535
035   $ab10783660-39ule_inst
035   $aLE01305144$9ExL
040   $aDip.to Matematica$beng
084   $aAMS 22D10
084   $aAMS 22E
084   $aAMS 22E25
084   $aAMS 22E27
084   $aAMS 41A15
084   $aAMS 43A35
084   $aAMS 94A12
084   $aQA403.S27
100 1 $aSchempp, Walter$048127
245 10$aHarmonic analysis on the Heisenberg nilpotent Lie group, with applications to signal theory /$cW. Schempp
260   $aHarlow :$bLongman,$c1986
300   $a199 p. :$bill. ;$c25 cm.
490 0 $aPitman research notes in mathematics series, ISSN 02693674 ;$v147
500   $aBibliography: p. 195-196
500   $aIncludes index
650  4$aHarmonic analysis
650  4$aLie groups
650  4$aNilpotent Lie groups
650  4$aSignal theory
650  4$aSignal theory (Telecommunication)
907   $a.b10783660$b23-02-17$c28-06-02
912   $a991000975739707536
945   $aLE013 22E SCH11 C.2 (1986)$g2$i2013000129990$lle013$o-$pE0.00$q-$rl$s-  $t0$u0$v0$w0$x0$y.i10883551$z28-06-02
945   $aLE013 22E SCH11 C.1 (1986)$g1$i2013000130002$lle013$o-$pE0.00$q-$rl$s-  $t0$u0$v0$w0$x0$y.i10883563$z28-06-02
996   $aHarmonic analysis on the Heisenberg nilpotent Lie group$983249
997   $aUNISALENTO
998   $ale013$b01-01-93$cm$da  $e-$feng$guk $h0$i2