i Show that for any Lattice L and s, t ∈ L, s ∧ (s ∨...

Show that the reciprocal lattice of a hexagonal lattice is a hexagonal Lattice and show its...

Show that the reciprocal lattice of a hexagonal lattice is a hexagonal Lattice and show its orientation w.r.t. the direct lattice.

Show that the cell form factor of the FCC lattice is: If h, k, l are...

Show that the cell form factor of the FCC lattice is: If h, k, l are partly even or odd, the summation is 0. If h, k, l are all even or all odd, summation is 4f. As usual, we mean hkl referred to the cubic conventional cell. (Please explain all steps)

Let S ∈ L(R2) be given by S(x1, x2) = (x1 +x2, x2) and let I...

Let S ∈ L(R2) be given by S(x1, x2) = (x1 +x2, x2) and let I ∈ L(R2) be the identity operator. Using the inner product defined in problem 1 for the standard basis and the dot product, compute <S, I>, || S ||, and || I || {Inner product in problem 1: Let W be an inner product space and v1, . . . , vn a basis of V. Show that <S, T> = <Sv1, T v1> +...

Let L be a lattice. Show that a∨(b∧c)≼(a∨b)∧(a∨b) (a∧b)∨(a∧c)≼a∧(b∨c) For all a,b,c ϵ L.

Let L be a lattice. Show that a∨(b∧c)≼(a∨b)∧(a∨b) (a∧b)∨(a∧c)≼a∧(b∨c) For all a,b,c ϵ L.

Let W be an inner product space and v1,...,vn a basis of V. Show that〈S, T...

Let W be an inner product space and v1,...,vn a basis of V. Show that〈S, T 〉 = 〈Sv1, T v1〉 + . . . + 〈Svn, T vn〉 for S,T ∈ L(V,W) is an inner product on L(V,W). Let S ∈ L(R^2) be given by S(x1, x2) = (x1 + x2, x2) and let I ∈ L(R^2) be the identity operator. Using the inner product defined in problem 1 for the standard basis and the dot product, compute 〈S,...

Show that in a regular lattice for small-world model, local clustering coefficient for any node is...

Show that in a regular lattice for small-world model, local clustering coefficient for any node is 3(c−2) 4(c−1) , where c is the average degree.

i) F o r t h e f o l l o w I n g...

i) F o r t h e f o l l o w I n g f i n d t h e ( c o m p. E x p.) f o u r I e r s e r i e s f o r x( t ) I I ) D r a w t h e am p &. P h a s e s p e c t r a I I I ) T...

a. Show that the reciprocal lattice for a simple cubic lattice is also a simple cubic...

a. Show that the reciprocal lattice for a simple cubic lattice is also a simple cubic lattice. b. Find the separation between closest lattice planes that have Miller indices (110)

take the lapace transform of dT/dt +kT=k(22-27U(t-2)+25U(t-7)). define L[T(t)]=W(s). show all steps

take the lapace transform of dT/dt +kT=k(22-27U(t-2)+25U(t-7)). define L[T(t)]=W(s). show all steps

(1) Draw the divisor lattice of D_{180}. - Show this is a lattice. - What is...

(1) Draw the divisor lattice of D_{180}. - Show this is a lattice. - What is the join and meet of the pair : 30 and 20? - Decompose D_{180} as a product of chain posets.