:: ALGSEQ_1 semantic presentation
:: deftheorem Def1 defines PSeg ALGSEQ_1:def 1 :
Lemma23:
for n being Element of NAT
for x being set st x in PSeg n holds
x is Element of NAT
;
theorem Th1: :: ALGSEQ_1:1
canceled;
theorem Th2: :: ALGSEQ_1:2
canceled;
theorem Th3: :: ALGSEQ_1:3
canceled;
theorem Th4: :: ALGSEQ_1:4
canceled;
theorem Th5: :: ALGSEQ_1:5
canceled;
theorem Th6: :: ALGSEQ_1:6
canceled;
theorem Th7: :: ALGSEQ_1:7
canceled;
theorem Th8: :: ALGSEQ_1:8
canceled;
theorem Th9: :: ALGSEQ_1:9
canceled;
theorem Th10: :: ALGSEQ_1:10
theorem Th11: :: ALGSEQ_1:11
theorem Th12: :: ALGSEQ_1:12
theorem Th13: :: ALGSEQ_1:13
theorem Th14: :: ALGSEQ_1:14
theorem Th15: :: ALGSEQ_1:15
theorem Th16: :: ALGSEQ_1:16
theorem Th17: :: ALGSEQ_1:17
:: deftheorem Def2 defines finite-Support ALGSEQ_1:def 2 :
:: deftheorem Def3 defines is_at_least_length_of ALGSEQ_1:def 3 :
Lemma43:
for R being non empty ZeroStr
for p being AlgSequence of R ex m being Element of NAT st m is_at_least_length_of p
Lemma44:
for R being non empty ZeroStr
for p being AlgSequence of R ex k being Element of NAT st
( k is_at_least_length_of p & ( for n being Element of NAT st n is_at_least_length_of p holds
k <= n ) )
Lemma46:
for k, l being Element of NAT
for R being non empty ZeroStr
for p being AlgSequence of R st k is_at_least_length_of p & ( for m being Element of NAT st m is_at_least_length_of p holds
k <= m ) & l is_at_least_length_of p & ( for m being Element of NAT st m is_at_least_length_of p holds
l <= m ) holds
k = l
:: deftheorem Def4 defines len ALGSEQ_1:def 4 :
theorem Th18: :: ALGSEQ_1:18
canceled;
theorem Th19: :: ALGSEQ_1:19
canceled;
theorem Th20: :: ALGSEQ_1:20
canceled;
theorem Th21: :: ALGSEQ_1:21
canceled;
theorem Th22: :: ALGSEQ_1:22
theorem Th23: :: ALGSEQ_1:23
canceled;
theorem Th24: :: ALGSEQ_1:24
theorem Th25: :: ALGSEQ_1:25
:: deftheorem Def5 defines support ALGSEQ_1:def 5 :
theorem Th26: :: ALGSEQ_1:26
canceled;
theorem Th27: :: ALGSEQ_1:27
theorem Th28: :: ALGSEQ_1:28
theorem Th29: :: ALGSEQ_1:29
:: deftheorem Def6 defines <% ALGSEQ_1:def 6 :
Lemma58:
for R being non empty ZeroStr
for p being AlgSequence of R st p = <%(0. R)%> holds
len p = 0
theorem Th30: :: ALGSEQ_1:30
canceled;
theorem Th31: :: ALGSEQ_1:31
theorem Th32: :: ALGSEQ_1:32
theorem Th33: :: ALGSEQ_1:33
theorem Th34: :: ALGSEQ_1:34