AMITâS CONJECTURE FOR WORDS OVER TWO VARIABLES
Algebraic structure introduced us to some mathematical structures, and one of the structure is a group. Unlike the usual number system where the multiplication always commute, one can construct a group that does not necessarily commute. To measure the commutativity of two elements in a group, we...
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id-itb.:649562022-06-17T10:52:27ZAMITâS CONJECTURE FOR WORDS OVER TWO VARIABLES Siddiq Wira Awaldy, Muhammad Indonesia Final Project finite group, verbal mapping, word over two variable iii INSTITUT TEKNOLOGI BANDUNG https://digilib.itb.ac.id/gdl/view/64956 Algebraic structure introduced us to some mathematical structures, and one of the structure is a group. Unlike the usual number system where the multiplication always commute, one can construct a group that does not necessarily commute. To measure the commutativity of two elements in a group, we can define commutator by [x; y] = x????1y????1xy for all x; y 2 G. Then one can say that 2 elements x and y in G are commute if and only if [x; y] = e where e is an identity element of G. One could ask ”what is the probability of two elements x and y in a finite group such that [x; y] = e?” Then what if we replace [x; y] with another expression? What if we replace e with another element in G? Using free group, we can define a probability associated with verbal subgroup of G denoted as PG;w(g). There are many open problems about structure of PG;w(g), and its implication to the underlying group structure. One of them is Amit’s Conjecture which said the value of PG;w(e) never be less than 1 jGj for every finite nilpotent group G. In this final project, we will proof Amit’s Conjecture for any words over two variable. text |
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Indonesia Indonesia |
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Institut Teknologi Bandung |
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Indonesia |
| description |
Algebraic structure introduced us to some mathematical structures, and one of the structure is
a group. Unlike the usual number system where the multiplication always commute, one can
construct a group that does not necessarily commute. To measure the commutativity of two
elements in a group, we can define commutator by [x; y] = x????1y????1xy for all x; y 2 G. Then
one can say that 2 elements x and y in G are commute if and only if [x; y] = e where e is
an identity element of G. One could ask ”what is the probability of two elements x and y in
a finite group such that [x; y] = e?” Then what if we replace [x; y] with another expression?
What if we replace e with another element in G? Using free group, we can define a probability
associated with verbal subgroup of G denoted as PG;w(g). There are many open problems
about structure of PG;w(g), and its implication to the underlying group structure. One of them
is Amit’s Conjecture which said the value of PG;w(e) never be less than 1
jGj for every finite
nilpotent group G. In this final project, we will proof Amit’s Conjecture for any words over
two variable. |
| format |
Final Project |
| author |
Siddiq Wira Awaldy, Muhammad |
| spellingShingle |
Siddiq Wira Awaldy, Muhammad AMITâS CONJECTURE FOR WORDS OVER TWO VARIABLES |
| author_facet |
Siddiq Wira Awaldy, Muhammad |
| author_sort |
Siddiq Wira Awaldy, Muhammad |
| title |
AMITâS CONJECTURE FOR WORDS OVER TWO VARIABLES |
| title_short |
AMITâS CONJECTURE FOR WORDS OVER TWO VARIABLES |
| title_full |
AMITâS CONJECTURE FOR WORDS OVER TWO VARIABLES |
| title_fullStr |
AMITâS CONJECTURE FOR WORDS OVER TWO VARIABLES |
| title_full_unstemmed |
AMITâS CONJECTURE FOR WORDS OVER TWO VARIABLES |
| title_sort |
amitâs conjecture for words over two variables |
| url |
https://digilib.itb.ac.id/gdl/view/64956 |
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1822932591692480512 |