Classical Mechanics and Special Relativity with GA

Classical Mechanics and Special Relativity with GA Suprit Singh

An Outline of Geometric Algebra A little Un-Learning Geometric ProductClifs Vector Algebra Vector Equations • GA is Clifford Algebra with GEOMETRIC and PHYSICAL interpretation of its mathematical elements. • We need to unlearn a few ambiguous things ironically prevalent : the product of vectors… • The magnitude of a vector is contained in the scalar product… • The direction being specified by Cross product….which is one roadblock we wish to clear… so stamp them out..introduce the ‘OUTER’ product

An Outline of Geometric Algebra A little Un-Learning Geometric Product Clifs Vector Algebra Vector Equations Recipe for the Vector Salad Define The addition of two is then Perfectly legitimate powerful axiom…. any resemblance???? Yes...its like a complex number, isn’t it? We’ll use this from now on, instead of the Inner and Outer products…

An Outline of Geometric Algebra A little Un-Learning Geometric Product Clifs Vector Algebra Vector Equations The elements of GA are generated through exterior products..scalars, vectors, bivectors, trivectors and so on…multi-vectors…multi-multi-vectors…and we can sum any of them…(remember its not the ordinary addition) such a general element we call a ‘CLIF’ and they form a linear space. With all this..there’s a wonderful surprise package..you can ‘divide’ here… Here’s a example ,

An Outline of Geometric Algebra A little Un-Learning Geometric ProductClifs Vector Algebra Vector Equations • Okay, here are some of the ‘Old’ things in ‘New’ and ‘Better’ ways… • The area of a parallelogram, with the orientation • Vector Identities

An Outline of Geometric Algebra A little Un-Learning Geometric ProductClifs Vector Algebra Vector Equations • And some of the New Division Flavor

The Vector and Spinor PlaneG(2) Plane- SpinorsRotation in a plane Schwarzschild Black Hole • The Coordinates Metric Singularities Falling In Formation Penrose Diagram • The N-dimensional Euclidean Space is the solution of • where the dimensionality of the Space is hidden in the element I, called the pseudoscalar. • Choose • We get the solution • which corresponds to the Euclidean Plane spanned by

The Vector and Spinor PlaneG(2)Plane- SpinorsRotation in a plane • Interpreting the pseudoscalar: • Directed Unit Area in the plane • Generator of Rotations • Plus we have our Algebra splitting two • The even sub-algebra forms the well known Complex Plane

The Vector and Spinor PlaneG(2) Plane- SpinorsRotation in a plane • The re exists one-to-one mapping between Complex Numbers and Vectors through the choice of scalar axis • We call them 2-spinors as their ‘Operational ‘ Job is Rotating vectors, see… • This also then implies that Angle better be interpreted as area

The Three Space An Extended Choice Cross ProductQuaternions Reflections Rotations • Extending our previous choice of I, • we have 8-d graded linear space • We got 3 bivectors corresponding to 3 planes…so alls same as 2-plane…with a few extras

The Three Space An Extended ChoiceCross Product Quaternions Reflections Rotations • OMG, Where’s the Cross Product ???? • Here it is…the dual of the plane formed by two vectors… • And here’s where the Quaternions materialize… • They are bivectors and not the vectors if the scalar part is set to zero…this solves their Reflection problem….Trumpets Please...

The Three Space An Extended Choice Cross ProductQuaternions Reflections Rotations • Here’s the First Power Display of GA…The reflection of a vector written compactly as a simple expression • And for any general multivector

The Three Space An Extended Choice Cross ProductQuaternions Reflections Rotations • The Second Power : Rotations expressed in a double sided generic form… • Start off with a vector and subject it to two successive reflections : • Define Rotor, R and then inspecting components of vector, a in and out of plane A..

The Three Space An Extended Choice Cross ProductQuaternions Reflections Rotations We get to an Important conclusion :

The Three Space An Extended Choice Cross ProductQuaternions Reflections Rotations • Euler Angles : We require • Hence adopt the procedure :

The Three Space An Extended Choice Cross ProductQuaternions Reflections Rotations A sleek and simple representation

Spacetime Algebra (STA)Vectors Higher Elements Spacetime Split Dynamical Relative Vectors Lorentz Rotation • The postulates of Special Relativity require a non-Euclidean metric signature… • That is, we need modify our condition in Euclidean spaces.. • The mixed metric gives rise to reciprocal spaces… • Then any spacetime point is given by :

Spacetime Algebra (STA)Vectors Higher ElementsSpacetime Split Dynamical Relative Vectors Lorentz Rotation • Bivectors : • The timelike bivectors square to +1…we can see hyperbolic geometry coming up.. • Pseudoscalar : Gives a useful map between the 2 types of Bivectors…

Spacetime Algebra (STA)Vectors Higher Elements Spacetime Split Dynamical Relative Vectors Lorentz Rotation • The invariant interval for a timelike path for λ = τ implies… • In the rest frame, the proper time is a preferred parameter of path • such that velocity is timelike..and can be identified with • Choose the frame of rest vectors normal to v…den a general event can be decomposed as • where as you see..the x is a relative vector/ spacetime bivector for a event… • The invariants remain same for all observers…

Spacetime Algebra (STA)Vectors Higher Elements Spacetime Split Dynamical Relative Vectors Lorentz Rotation • Some Relative Vectors… • Relative Velocity : • Momentum and Energy : • Proper Acceleration Bivector:

Spacetime Algebra (STA)Vectors Higher Elements Spacetime Split Dynamical Relative Vectors Lorentz Rotation • Generalize 3D Euclidean rotation to Minkowski…requiring… • defining the Lorentz transformation from one frame to another…through 6 generators.. • which for example for boost in z-direction gives…

Spacetime Algebra (STA)Vectors Higher Elements Spacetime Split Dynamical Relative Vectors Lorentz Rotation • Some applications… • Relativistic Velocity Addition • Doppler Effect

Classical Mechanics Constant Force Angular Momentum Central Force Non-inertial frames Magnetic Field • Motion under a constant force :

Classical Mechanics Constant ForceAngular Momentum Central Force Non-inertial frames Magnetic Field • Angular momentum Bivector : encodes are swept by a radius vector around some origin… • Hence the definition requires.. • The toque is also then • In terms of the geometric product, • In situations where there is spherical symmetry, L is conserved, with magnitude

Classical Mechanics Constant Force Angular MomentumCentral Force Non-inertial frames Magnetic Field • V=V(r), then Total E is conserved… • Consider • Spinor Way:

Classical Mechanics Constant Force Angular MomentumCentral Force Non-inertial framesMagnetic Field

Classical Mechanics Constant Force Angular MomentumCentral Force Non-inertial frames Magnetic Field Motion in a constant Magnetic Field :

A Look at ElectromagnetismThe Lorentz Force Covariant Maxwell’s Equation • The quantity on left is relative vector, • , we multiply both sides by ‘gamma’ to get derivative wrt proper time… • Similarly, for B, • Combining , • where : • Define:

A Look at ElectromagnetismThe Lorentz ForceCovariant Maxwell’s Equation • The Lorentz Force law can now be written as, • The power equation is now, • Adding latter to the first after a suitable multiplication, we have the covariant law… • The Covariant Maxwell Equation :

A Look at ElectromagnetismThe Lorentz Force Covariant Maxwell’s Equation • First, we combine the two equations for E and B as • Introducing F : • Writing • We have the Maxwell Equation : • And as a consequence,

Thank you

Classical Mechanics and Special Relativity with GA