9. So why is AI so Important in Mobile?
When we are stationary we can use tools.
When we travel we need help.
10. How far has AI progressed?
And how far does it need to go?
Pose the question ‘can a machine think creatively’…
Or put another way
Are humans WET computers?
16. What about mobile (ARM) and mobile
“Moore’s Law is
Irrelevant in Mobile.”
Mobile Chips Optimize
for power.
Run slightly behind
Intel Desktop chips
100
Watts
18. POWER
2053
20202030204020502060
2080
Perspective we have a
long way to go!
Human brain is 85billion Neurons
of analogy processing.
Classical
Parity
Quantum
Parity
100m
1b
10b
100b
1t
10t
100t
1p
10p
100p
1e
10e 100e
What if Quantum is not
enough?
Oh and BTW we
are already at
10Kw. The human
brain is 20w.
29. There is no algorithm which will find
a solution to FLT if it is arbitrary to it.
(by arbitrary we mean ‘unknown’) JT
Matiyasevich
Ruohonen and Baxa prove
Exponentiated Diophantine
equations can be rewritten as a
regular Diophantine equations
with the addition of an infinite
set of terms therefore:-
34. How do we estimate the Classical to Quantum multiplier
Only 1 Neuron but
can: Swim. Hunt.
Avoid Prey.
Quess they need
about the power of
1 remote control
chip.
Convenience when you travel
1 bill
2 a local number (several if necessary)
So how good are computers
Fiber architecture of the brain. Measured from diffusion spectral imaging (DSI). The fibers are color-coded by direction: red = left-right, green = anterior-posterior, blue = through brain stem. www.humanconnectomeproject.org
Human brain
Neuron firing rate
Extrapolate
And a bit more
In classical times people believed that we were only discovering things that had already been ‘invented’ by the GODS.
And when a Greek playwrite ‘created’ a play they were merely documenting the human condition.
They were DISCOVERING, NOT INVENTING.
But is AI a linear problem
The Maths
The unpronounsable paper
FERMAT
Fermat’s last theorem is an exponential Diophantine equation.
Everyone know Fermat’s last theorem?
Diophantine equations - everyone knows from their childhood. Why are these especially important?
In mathematics, a Diophantine equation is a polynomial equation.
These ENCODE a wide range of problems, from word problems to more complicated problems in the sciences.
They require creative thought.
(go to triangle and hypercube)
Yuri Matiyasevich is best known for proving this – by solving Hilbert’s 10th problem with a negative answer.
He proved that Diophantine Equations cannot be solved by machines.
After decades of work, Andrew Wiles DID solve Fermat’s last theorem.
Here was the paradox –
Humans CAN solve something a computer cannot.
In my book, Ya Suenan Los Androides?, Are the Androids Dreaming Yet? I discuss our incredible minds.