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Inner Product Spaces
Examples
Inner Product Spaces
§6.2 Inner product spaces
Satya Mandal, KU
Summer 2017
Satya Mandal, KU Inner Product Spaces §6.2 Inner product spaces
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Inner Product Spaces
Examples
Goals
◮ Concept of length, distance, and angle in R2 or Rn is
extended to abstract vector spaces V. Such a vector
space will be called an Inner Product Space.
◮ An Inner Product Space V comes with an inner product
n
that is like dot product in R .
◮ n
The Euclidean space R is only one example of such Inner
Product Spaces.
Satya Mandal, KU Inner Product Spaces §6.2 Inner product spaces
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Inner Product Spaces
Examples
Inner Product
Definition Suppose V is a vector space.
◮ An inner product on V is a function
h∗,∗i : V × V → R that associates
to each ordered pair (u,v) of vectors a real number
hu,vi, such that for all u,v,w in V and scalar c, we have
1. hu,vi = hv,ui.
2. hu,v +wi = hu,vi+hu,wi.
3. chu,vi = hcu,vi.
4. hv,vi ≥ 0 and v = 0 ⇐⇒ hv,vi = 0.
◮ The vector space V with such an inner product is called
an inner product space.
Satya Mandal, KU Inner Product Spaces §6.2 Inner product spaces
Preview
Inner Product Spaces
Examples
Theorem 6.2.1: Properties
Let V be an inner product space. Let u,v ∈ V be two vectors
and c be a scalar, Then,
1. h0,vi = 0
2. hu +v,wi = hu,wi+hv,wi
3. hu,cvi = chu,vi
Proof. We would have to use the properties in the definition.
1. Use (3): h0,vi = h00,vi = 0h0,vi = 0.
2. Use commutativity (1) and (2):
hu+v,wi=hw,u+vi=hw,ui+hw,vi=hu,wi+hv,wi
3. Use (1) and (3): hu,cvi = hcv,ui = chv,ui = chu,vi
The proofs are complete.
Satya Mandal, KU Inner Product Spaces §6.2 Inner product spaces
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